Perturbation of fuzzy sets and fuzzy reasoning based on normalized Minkowski distances

被引:27
|
作者
Dai, Songsong [1 ]
Pei, Daowu [1 ]
Wang, San-min [1 ]
机构
[1] Zhejiang Sci Tech Univ, Dept Math, Sch Sci, Hangzhou 310018, Zhejiang, Peoples R China
来源
FUZZY SETS AND SYSTEMS | 2012年 / 189卷 / 01期
关键词
Fuzzy set; Fuzzy reasoning; Minkowski distance; Perturbation; SYSTEMS VARIABLES; LOGIC FOUNDATION; DELTA-EQUALITIES; ROBUSTNESS; SIMILARITY; CONTINUITY; INFERENCE;
D O I
10.1016/j.fss.2011.07.012
中图分类号
TP301 [理论、方法];
学科分类号
081202 ;
摘要
In this paper, we extend the concept of the perturbation of fuzzy sets based on normalized Minkowski distances and present some new conclusions on perturbation raised by various operations of fuzzy sets. These operations are induced by triangular norms and conorms. Furthermore, we discuss the perturbation of fuzzy reasoning. (C) 2011 Elsevier B.V. All rights reserved.
引用
收藏
页码:63 / 73
页数:11
相关论文
共 50 条
  • [1] Distances between intuitionistic fuzzy sets and their applications in reasoning
    Szmidt, E
    Kacprzyk, J
    [J]. COMPUTATIONAL INTELLIGENCE FOR MODELLING AND PREDICTION, 2005, 2 : 101 - 116
  • [2] Perturbation of fuzzy reasoning
    Ying, MS
    [J]. IEEE TRANSACTIONS ON FUZZY SYSTEMS, 1999, 7 (05) : 625 - 629
  • [3] Fuzzy clustering with squared Minkowski distances
    Groenen, PJF
    Jajuga, K
    [J]. FUZZY SETS AND SYSTEMS, 2001, 120 (02) : 227 - 237
  • [4] An Evolutionary Fuzzy Clustering with Minkowski Distances
    Srivastava, Vivek
    Tripathi, Bipin K.
    Pathak, Vinay K.
    [J]. NEURAL INFORMATION PROCESSING, PT II, 2011, 7063 : 753 - 760
  • [5] Robustness of fuzzy reasoning and δ-equalities of fuzzy sets
    Cai, KY
    [J]. IEEE TRANSACTIONS ON FUZZY SYSTEMS, 2001, 9 (05) : 738 - 750
  • [6] A new fuzzy interpolative reasoning method based on the areas of fuzzy sets
    Chang, Yu-Chuan
    Chen, Shyi-Ming
    Liau, Churn-Jung
    [J]. 2007 IEEE INTERNATIONAL CONFERENCE ON SYSTEMS, MAN AND CYBERNETICS, VOLS 1-8, 2007, : 198 - +
  • [7] Reasoning About Distance Based on Fuzzy Sets
    Hans W. Guesgen
    [J]. Applied Intelligence, 2002, 17 : 265 - 270
  • [8] Reasoning about distance based on fuzzy sets
    Guesgen, HW
    [J]. APPLIED INTELLIGENCE, 2002, 17 (03) : 265 - 270
  • [9] The Relationship between Fuzzy Reasoning Methods Based on Intuitionistic Fuzzy Sets and Interval-Valued Fuzzy Sets
    Luo, Minxia
    Li, Wenling
    Shi, Hongyan
    [J]. AXIOMS, 2022, 11 (08)
  • [10] Fuzzy interpolative reasoning for sparse fuzzy rule-based systems based on the slopes of fuzzy sets
    Chen, Shyi-Ming
    Hsin, Wen-Chyuan
    Yang, Szu-Wei
    Chang, Yu-Chuan
    [J]. EXPERT SYSTEMS WITH APPLICATIONS, 2012, 39 (15) : 11961 - 11969
12345